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package com.ctc.wstx.util;
import java.util.*;
/**
* An efficient (both memory and time) implementation of a Set used to
* verify that a given
* word is contained within the set. The general usage pattern is expected
* to be such that most checks are positive, ie. that the word indeed
* is contained in the set.
*
* Performance of the set is comparable to that of {@link java.util.TreeSet}
* for Strings, ie. 2-3x slower than {@link java.util.HashSet} when
* using pre-constructed Strings. This is generally result of algorithmic
* complexity of structures; Word and Tree sets are roughly logarithmic
* to the whole data, whereas Hash set is linear to the length of key.
* However:
*
* - WordSet can use char arrays as keys, without constructing Strings.
* In cases where there is no (need for) Strings, WordSet seems to be
* about twice as fast, even without considering additional GC caused
* by temporary String instances.
*
* - WordSet is more compact in its memory presentation; if Strings are
* shared its size is comparable to optimally filled HashSet, and if
* no such Strings exists, its much more compact (relatively speaking)
*
*
*
* Although this is an efficient set for specific set of usage patterns,
* one restriction is that the full set of words to include has to be
* known before constructing the set. Also, the size of the set is
* limited to total word content of about 20k characters; factory method
* does verify the limit and indicates if an instance can not be created.
*/
public final class WordSet
{
final static char CHAR_NULL = (char) 0;
/**
* Offset added to numbers to mark 'negative' numbers. Asymmetric,
* since range of negative markers needed is smaller than positive
* numbers...
*/
final static int NEGATIVE_OFFSET = 0xC000;
/**
* This is actually just a guess; but in general linear search should
* be faster for short sequences (definitely for 4 or less; maybe up
* to 8 or less?)
*/
final static int MIN_BINARY_SEARCH = 7;
/**
* Compressed presentation of the word set.
*/
final char[] mData;
/*
////////////////////////////////////////////////
// Life-cycle
////////////////////////////////////////////////
*/
private WordSet(char[] data) {
mData = data;
}
public static WordSet constructSet(TreeSet wordSet)
{
return new WordSet(new Builder(wordSet).construct());
}
public static char[] constructRaw(TreeSet wordSet)
{
return new Builder(wordSet).construct();
}
/*
////////////////////////////////////////////////
// Public API
////////////////////////////////////////////////
*/
public boolean contains(char[] buf, int start, int end) {
return contains(mData, buf, start, end);
}
@SuppressWarnings("cast")
public static boolean contains(char[] data, char[] str, int start, int end)
{
int ptr = 0; // pointer to compressed set data
main_loop:
do {
int left = end-start;
// End of input String? Need to have the run entry:
if (left == 0) {
return (data[ptr+1] == CHAR_NULL);
}
int count = data[ptr++];
// Nope, but do we have an end marker?
if (count >= NEGATIVE_OFFSET) {
// How many chars do we need to have left to match?
int expCount = count - NEGATIVE_OFFSET;
if (left != expCount) {
return false;
}
while (start < end) {
if (data[ptr] != str[start]) {
return false;
}
++ptr;
++start;
}
return true;
}
// No, need to find the branch to follow, if any
char c = str[start++];
// Linear or binary search?
if (count < MIN_BINARY_SEARCH) {
// always at least two branches; never less
if (data[ptr] == c) {
ptr = (int) data[ptr+1];
continue main_loop;
}
if (data[ptr+2] == c) {
ptr = (int) data[ptr+3];
continue main_loop;
}
int branchEnd = ptr + (count << 1);
// Starts from entry #3, if such exists
for (ptr += 4; ptr < branchEnd; ptr += 2) {
if (data[ptr] == c) {
ptr = (int) data[ptr+1];
continue main_loop;
}
}
return false; // No match!
}
{ // Ok, binary search:
int low = 0;
int high = count-1;
int mid;
while (low <= high) {
mid = (low + high) >> 1;
int ix = ptr + (mid << 1);
int diff = data[ix] - c;
if (diff > 0) { // char was 'higher', need to go down
high = mid-1;
} else if (diff < 0) { // lower, need to go up
low = mid+1;
} else { // match
ptr = (int) data[ix+1];
continue main_loop;
}
}
}
// If we fall here, no match!
return false;
} while (ptr != 0);
// If we reached an end state, must match the length
return (start == end);
}
public boolean contains(String str) {
return contains(mData, str);
}
@SuppressWarnings("cast")
public static boolean contains(char[] data, String str)
{
// Let's use same vars as array-based code, to allow cut'n pasting
int ptr = 0; // pointer to compressed set data
int start = 0;
int end = str.length();
main_loop:
do {
int left = end-start;
// End of input String? Need to have the run entry:
if (left == 0) {
return (data[ptr+1] == CHAR_NULL);
}
int count = data[ptr++];
// Nope, but do we have an end marker?
if (count >= NEGATIVE_OFFSET) {
// How many chars do we need to have left to match?
int expCount = count - NEGATIVE_OFFSET;
if (left != expCount) {
return false;
}
while (start < end) {
if (data[ptr] != str.charAt(start)) {
return false;
}
++ptr;
++start;
}
return true;
}
// No, need to find the branch to follow, if any
char c = str.charAt(start++);
// Linear or binary search?
if (count < MIN_BINARY_SEARCH) {
// always at least two branches; never less
if (data[ptr] == c) {
ptr = (int) data[ptr+1];
continue main_loop;
}
if (data[ptr+2] == c) {
ptr = (int) data[ptr+3];
continue main_loop;
}
int branchEnd = ptr + (count << 1);
// Starts from entry #3, if such exists
for (ptr += 4; ptr < branchEnd; ptr += 2) {
if (data[ptr] == c) {
ptr = (int) data[ptr+1];
continue main_loop;
}
}
return false; // No match!
}
{ // Ok, binary search:
int low = 0;
int high = count-1;
int mid;
while (low <= high) {
mid = (low + high) >> 1;
int ix = ptr + (mid << 1);
int diff = data[ix] - c;
if (diff > 0) { // char was 'higher', need to go down
high = mid-1;
} else if (diff < 0) { // lower, need to go up
low = mid+1;
} else { // match
ptr = (int) data[ix+1];
continue main_loop;
}
}
}
// If we fall here, no match!
return false;
} while (ptr != 0);
// If we reached an end state, must match the length
return (start == end);
}
/*
////////////////////////////////////////////////
// Private methods
////////////////////////////////////////////////
*/
/*
////////////////////////////////////////////////
// Helper classes
////////////////////////////////////////////////
*/
private final static class Builder
{
final String[] mWords;
char[] mData;
/**
* Number of characters currently used from mData
*/
int mSize;
public Builder(TreeSet wordSet) {
int wordCount = wordSet.size();
mWords = new String[wordCount];
wordSet.toArray(mWords);
/* Let's guess approximate size we should need, assuming
* average word length of 6 characters, and 100% overhead
* in structure:
*/
int size = wordCount * 12;
if (size < 256) {
size = 256;
}
mData = new char[size];
}
/**
* @return Raw character data that contains compressed structure
* of the word set
*/
public char[] construct()
{
// Uncomment if you need to debug array-out-of-bound probs
//try {
// Let's check degenerate case of 1 word:
if (mWords.length == 1) {
constructLeaf(0, 0);
} else {
constructBranch(0, 0, mWords.length);
}
//} catch (Throwable t) { System.err.println("Error: "+t); }
char[] result = new char[mSize];
System.arraycopy(mData, 0, result, 0, mSize);
return result;
}
/**
* Method that is called recursively to build the data
* representation for a branch, ie. part of word set tree
* that still has more than one ending
*
* @param charIndex Index of the character in words to consider
* for this round
* @param start Index of the first word to be processed
* @param end Index of the word after last word to be processed
* (so that number of words is end - start - 1
*/
@SuppressWarnings("cast")
private void constructBranch(int charIndex, int start, int end)
{
// If more than one entry, need to divide into groups
// First, need to add placeholder for branch count:
if (mSize >= mData.length) {
expand(1);
}
mData[mSize++] = 0; // placeholder!
/* structStart will point to second char of first entry
* (which will temporarily have entry count, eventually 'link'
* to continuation)
*/
int structStart = mSize + 1;
int groupCount = 0;
int groupStart = start;
String[] words = mWords;
/* First thing we need to do is a special check for the
* first entry -- it may be "runt" word, one that has no
* more chars but also has a longer version ("id" vs.
* "identifier"). If there is such a word, it'll always
* be first in alphabetic ordering:
*/
if (words[groupStart].length() == charIndex) { // yup, got one:
if ((mSize + 2) > mData.length) {
expand(2);
}
/* Nulls mark both imaginary branching null char and
* "missing link" to the rest
*/
mData[mSize++] = CHAR_NULL;
mData[mSize++] = CHAR_NULL;
// Ok, let's then ignore that entry
++groupStart;
++groupCount;
}
// Ok, then, let's find the ('real') groupings:
while (groupStart < end) {
// Inner loop, let's find the group:
char c = words[groupStart].charAt(charIndex);
int j = groupStart+1;
while (j < end && words[j].charAt(charIndex) == c) {
++j;
}
/* Ok, let's store the char in there, along with count;
* count will be needed in second, and will then get
* overwritten with actual data later on
*/
if ((mSize + 2) > mData.length) {
expand(2);
}
mData[mSize++] = c;
mData[mSize++] = (char) (j - groupStart); // entries in group
groupStart = j;
++groupCount;
}
/* Ok, groups found; need to loop through them, recursively
* calling branch and/or leaf methods
*/
// first let's output the header, ie. group count:
mData[structStart-2] = (char) groupCount;
groupStart = start;
// Do we have the "runt" to skip?
if (mData[structStart] == CHAR_NULL) {
structStart += 2;
++groupStart;
}
int structEnd = mSize;
++charIndex;
for (; structStart < structEnd; structStart += 2) {
groupCount = (int) mData[structStart]; // no sign expansion, is ok
// Ok, count gotten, can now put the 'link' (pointer) in there
mData[structStart] = (char) mSize;
if (groupCount == 1) {
/* One optimization; if it'd lead to a single runt
* entry, we can just add 'null' link:
*/
String word = words[groupStart];
if (word.length() == charIndex) {
mData[structStart] = CHAR_NULL;
} else { // otherwise, let's just create end state:
constructLeaf(charIndex, groupStart);
}
} else {
constructBranch(charIndex, groupStart,
groupStart + groupCount);
}
groupStart += groupCount;
}
// done!
}
/**
* Method called to add leaf entry to word set; basically
* "here is the rest of the only matching word"
*/
private void constructLeaf(int charIndex, int wordIndex)
{
String word = mWords[wordIndex];
int len = word.length();
char[] data = mData;
// need room for 1 header char, rest of the word
if ((mSize + len + 1) >= data.length) {
data = expand(len+1);
}
data[mSize++] = (char) (NEGATIVE_OFFSET + (len - charIndex));
for (; charIndex < len; ++charIndex) {
data[mSize++] = word.charAt(charIndex);
}
}
private char[] expand(int needSpace)
{
char[] old = mData;
int len = old.length;
int newSize = len + ((len < 4096) ? len : (len >> 1));
/* Let's verify we get enough; should always be true but
* better safe than sorry
*/
if (newSize < (mSize + needSpace)) {
newSize = mSize + needSpace + 64;
}
mData = new char[newSize];
System.arraycopy(old, 0, mData, 0, len);
return mData;
}
}
}